A stone is projected from point `P` on the inclined plane with velocity `v_(0) = 10 m//sec` directed perpendicular to the plane. The time taken (in second) by the stone to strike the horizontal ground `S` is (Given `PO = l = 10`meter)(Take `g = 10m//s^(2)`)

A ball is projected horizontally from an inclined plane with a velocity V, as shown in the figure. It will strike the plane after a time

A ball is projected from point A with velocity 10 ms^(-1) perpendicular to the inclined plane as shown in figure. Range of the ball on the inclined plane is

A ball is projected from a point in a horizontal plane with a velocity of 20 m/s at 30^(@) with the horizontal. Coefficient of restitution is 0.8, then

A particle of mass m is thrown horizontally from point P , as shown in the figure, with speed 5 m//s . It strikes an inclined plane perpendicularly as shown. The inclination of the plane is 30^(@) with the horizontal. Then, the height h shown in the figure is ( Take g = 10 m//s^(2) ) .

A ball is projected from a point O as shown in figure it will strike the ground after (g = 10 m/ s^(2) )

A stone is projected from the ground with velocity 50(m)/(s) at an angle of 30^@ . It crosses a wall after 3 sec. How far beyond the wall the stone will strike the ground (g=10(m)/(sec^2) ?

A stone is projected from the ground with velocity 50(m)/(s) at an angle of 30^@ . It crosses a wall after 3 sec. How far beyond the wall the stone will strike the ground (g=10(m)/(sec^2) ?

A particle is projected from the bottom of an inclined plane of inclination 30^@ with velocity of 40 m//s at an angle of 60^@ with horizontal. Find the speed of the particle when its velocity vector is parallel to the plane. Take g = 10 m//s^2 .

A stone"is projected from the ground with a velocity of 14 ms^(-1) one second later it clears a wall 2m high. The angle of projection is (g = 10ms^(-2) )

A stone is projected from the ground with a velocity of 14 ms ^(-1). One second later it clears a wall 2m high. The angle of projection is (g = 10 ms ^(-2))